arXiv:math/0309011 Abstract

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Random walks on the torus with several generators

Published 2003-08-31, updated 2004-04-27Version 2

Our paper gives bounds for the rate of convergence for a class of random walks on the d-dimensional torus generated by a set of n vectors in R^d/Z^d. We give bounds on the discrepancy distance from Haar measure; our lower bound holds for all such walks, and if the generators arise from the rows of a "badly approximable" matrix, then there is a corresponding upper bound. The bounds are sharp for walks on the circle.

Comments: 10 pages; related work at http://www.math.hmc.edu/~su/papers.html

Journal: Random Structures and Algorithms 25 (2004), 336-345.

DOI: 10.1002/rsa.20029

Categories: math.PR

Subjects: 60B15, 11J13, 11K38

Keywords: random walks, lower bound holds, generators arise, haar measure, corresponding upper bound

Tags: journal article

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Random walks on the torus with several generators

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Random walks on the torus with several generators

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